EXTERIOR ANGLES

EXTERIOR ANGLES

Angles When the sides of a polygon are extended, other angles are formed. The original angles are the interior angles. The angles that form linear pairs with the interior angles are the exterior angles.

EXTERIOR ANGLE THEOREM An exterior angle of a triangle is equal in measure to the sum of the measures of its two remote interior angles. remote interior angles Exterior angle

EXTERIOR ANGLE THEOREM (YOUR NEW BEST FRIEND) The measure of an exterior angle in a triangle is the sum of the measures of the 2 remote interior angles remo te interi or angle s 2 1 3 4 m 1 m 2 m 4 exteri or angle

EXTERIOR ANGLE THEOREM m 1 m A m B

EXAMPLES m FHG 180 – 111 69 pair m G 60 69 linear

EXAMPLES Find x & y y 30 82 y 112 82 30 x y x 68 y 180 30 82 x 180 112 x 68 x

EXAMPLES Find m JKM 2x – 5 x 70x – 5 70 x 75 m JKM 2(75) 5 m JKM 150 - 5 m JKM 145

EXAMPLES Solve for y in the diagram. Solve on your own before viewing the Solution

SOLUTION 4y 35 56 y 3y 35 56 3y 21 y 27

EXAMPLES Find the measure of 1 in the diagram shown. Solve on your own before viewing the Solution

SOLUTION 40 3x 5x 10 40 2x 10 50 2x 25 x m 1 5x - 10 m 1 5(25) 10 1 125 m 10 m 1 115

CHECKPOINT: COMPLETE THE EXERCISES.

SOLUTION Right Scalene triangle x 70 3x 10 70 2x 10 60 2x 30 x 3 (30) 10 100

TRIANGLE INEQUALITIES

Make A Triangle Construct triangle DEF. D D F E F E

Make A Triangle Construct triangle DEF. D D F E F E

Make A Triangle Construct triangle DEF. D E

Make A Triangle Construct triangle DEF. D E

Make A Triangle Construct triangle DEF. D E

Make A Triangle Construct triangle DEF. 5 3 D E 13 Q: What’s the problem with this? A: The shorter segments can’t reach each other to complete the triangle. They don’t add up.

Triangle Inequality Conjecture The sum of the lengths of any two sides of a triangle is greater than the length of the third side. Add the two smallest sides; they MUST be larger than the third side for the triangle to be formed.

Make A Triangle Can the following lengths form a triangle? 2. 1. 3. 4. 2 ft 4 mm 5 7 ft 9 ft 5 mm 15 𝟐 cm 13 10 ft 𝟏𝟑 ft mm cm 6. 5. 7. 4 8. ft 7 ft 10 8m 10 cm 7 ft mm 7m mm 1m 3 mm 𝟕 𝟓 13 ft mm 6 mm 10. 12. 9. 11. 9 12 7 mm 1 mm mm mm 8 mm mm 2 22 5 𝟏𝟑 𝟏𝟐

Side-Angle Conjecture In a triangle, if one side is longer than another side, then angle opposite the longer side is larger than the other.

Side-Angle C b a B What’s the biggest side? What’s the biggest angle? What’s the smallest side? What’s the smallest angle? c b B a A A

Side-Angle 46 Rank the sides from greatest to least. b a 42 92 b c a c Rank the angles from greatest to A least. C 4 A B 7 B 5 C